What's the integral of int (tanx)*(e^x)dx?

1 Answer
Rhys
Dec 17, 2017

Some guidence:

Explanation:

This is a very interesting questions, but i didnt get to far finding an exact antiderivative solution, then i also tried an online integral calculator....

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There is one way i can think of that can approximate a solutio:

Use the Macluaren series:

y(x) = sum_(n=0) ^oo (y^(n)(0)* x^n)/(n!)

Letting y(x) = e^x * tanx

=> y'(x) = e^x ( tanx + sec^2 x )

=> y''(x) = e^x (tanx + 2sec^2 x + 2sec^2x tanx )
.
.
.

Then evaluating each of these at x = 0 and using the maclauren series, then integrating using power rule:

=> int sum_(n=0) ^oo (y^(n)(0)* x^n)/(n!) dx

Hope this was a good step in the right direction to an approximat answer!

Now here is an interesting question!:

int e^x sinx dx = ??

Give it a go!

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